In this paper we study connections between topological games
such
as Rothberger, Menger and compact-open, and relate these games
to
properties involving covers by $G_\delta$ subsets. The results
include:
(1) If Two has a winning strategy in the Menger
game on a regular space $X$, then $X$ is an Alster space.
(2) If Two has a winning strategy in the Rothberger game on a
topological space $X$, then the $G_\delta$-topology on $X$ is
LindelÃ¶f.
(3) The Menger game and the compact-open game are (consistently)
not
dual.